Carleson measures, tent embeddings, and Volterra-type integral operators on the unit ball

Abstract

In this paper, we establish a sharp comparison between Carleson-cube and Bergman-metric-ball conditions on the open unit ball and combine it with a Berezin-type characterization to prove embedding theorems for Besov spaces and Bergman spaces on into logarithmic tent spaces in the Bergman metric. As applications, we characterize the boundedness, compactness, and essential norms of the Volterra-type integral operators Tg and Ig acting from the Besov space Bt() to the general function space F(p,q,s).